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Mathematics

[1831] High order arbitrary Lagrangian-Eulerian finite difference WENO scheme for Hamilton-Jacobi equations

Yue Li China Academy of Engineering Physics Juan Cheng Institute of Applied Physics and Computational Mathematics Yinhua Xia University of Science and Technology of China Chi-Wang Shu Brown University

Numerical Analysis and Scientific Computing mathscidoc:2008.25006

Communications in Computational Physics, 26, 1530-1574, 2019.3

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[1832] Subdominant solutions of the differential equation

Yasutaka Sibuya University of Minnesota, Minneapolis, Minn., USA

TBD mathscidoc:1701.331338

Acta Mathematica, 119, (1), 235-272, 1967.4

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[1833] On sections of some holomorphic families of closed Riemann surfaces

Clifford J. Earle Cornell University, Ithaca, N. Y., USA Irwin Kra State University of New York, Stony Brook, N. Y., USA

TBD mathscidoc:1701.331497

Acta Mathematica, 137, (1), 49-79, 1975.4

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[1834] A hereditarily indecomposable $ {\mathcal{L}_{\infty}} $ -space that solves the scalar-plus-compact problem

Spiros A. Argyros Department of Mathematics, National Technical University of Athens Richard G. Haydon Brasenose College, Oxford, U.K.

TBD mathscidoc:1701.332023

Acta Mathematica, 206, (1), 1-54, 2009.3

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[1835] On some expansions of stable distribution functions

Harald Bergström

TBD mathscidoc:1701.332079

Arkiv for Matematik, 2, (4), 375-378, 1952.10

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Mathematics

[1831] High order arbitrary Lagrangian-Eulerian finite difference WENO scheme for Hamilton-Jacobi equations

Yue Li China Academy of Engineering Physics Juan Cheng Institute of Applied Physics and Computational Mathematics Yinhua Xia University of Science and Technology of China Chi-Wang Shu Brown University

Numerical Analysis and Scientific Computing mathscidoc:2008.25006

[1832] Subdominant solutions of the differential equation

Yasutaka Sibuya University of Minnesota, Minneapolis, Minn., USA

TBD mathscidoc:1701.331338

[1833] On sections of some holomorphic families of closed Riemann surfaces

Clifford J. Earle Cornell University, Ithaca, N. Y., USA Irwin Kra State University of New York, Stony Brook, N. Y., USA

TBD mathscidoc:1701.331497

[1834] A hereditarily indecomposable $ {\mathcal{L}_{\infty}} $ -space that solves the scalar-plus-compact problem

Spiros A. Argyros Department of Mathematics, National Technical University of Athens Richard G. Haydon Brasenose College, Oxford, U.K.

TBD mathscidoc:1701.332023

[1835] On some expansions of stable distribution functions

Harald Bergström

TBD mathscidoc:1701.332079

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